English

A certain reciprocal power sum is never an integer

Number Theory 2018-12-21 v1

Abstract

By (Z+)(\mathbb{Z}^+)^{\infty} we denote the set of all the infinite sequences S={si}i=1\mathcal{S}=\{s_i\}_{i=1}^{\infty} of positive integers (note that all the sis_i are not necessarily distinct and not necessarily monotonic). Let f(x)f(x) be a polynomial of nonnegative integer coefficients. Let Sn:={s1,...,sn}\mathcal{S}_n:=\{s_1, ..., s_n\} and Hf(Sn):=k=1n1f(k)skH_f(\mathcal{S}_n):=\sum_{k=1}^{n}\frac{1}{f(k)^{s_{k}}}. When f(x)f(x) is linear, Feng, Hong, Jiang and Yin proved in [A generalization of a theorem of Nagell, Acta Math. Hungari, in press] that for any infinite sequence S\mathcal{S} of positive integers, Hf(Sn)H_f(\mathcal{S}_n) is never an integer if n2n\ge 2. Now let degf(x)2f(x)\ge 2. Clearly, 0<Hf(Sn)<ζ(2)<20<H_f(\mathcal{S}_n)<\zeta(2)<2. But it is not clear whether the reciprocal power sum Hf(Sn)H_f(\mathcal{S}_n) can take 1 as its value. In this paper, with the help of a result of Erd\H{o}s, we use the analytic and pp-adic method to show that for any infinite sequence S\mathcal{S} of positive integers and any positive integer n2n\ge 2, Hf(Sn)H_f(\mathcal{S}_n) is never equal to 1. Furthermore, we use a result of Kakeya to show that if 1f(k)i=11f(k+i)\frac{1}{f(k)}\le\sum_{i=1}^\infty\frac{1}{f(k+i)} holds for all positive integers kk, then the union set S(Z+){Hf(Sn)nZ+}\bigcup\limits_{\mathcal{S}\in (\mathbb{Z}^+)^{\infty}} \{ H_f(\mathcal{S}_n) | n\in \mathbb{Z}^+ \} is dense in the interval (0,αf)(0,\alpha_f) with αf:=k=11f(k)\alpha_f:=\sum_{k=1}^{\infty}\frac{1}{f(k)}. It is well known that αf=12(πe2π+1e2π11)1.076674\alpha_f= \frac{1}{2}\big(\pi \frac{e^{2\pi}+1}{e^{2\pi}-1}-1\big)\approx 1.076674 when f(x)=x2+1f(x)=x^2+1. Our dense result infers that when f(x)=x2+1f(x)=x^2+1, for any sufficiently small ε>0\varepsilon >0, there are positive integers n1n_1 and n2n_2 and infinite sequences S(1)\mathcal{S}^{(1)} and S(2)\mathcal{S}^{(2)} of positive integers such that 1ε<Hf(Sn1(1))<11-\varepsilon<H_f(\mathcal{S}^{(1)}_{n_1})<1 and 1<Hf(Sn2(2))<1+ε1<H_f(\mathcal{S}^{(2)}_{n_2})<1+\varepsilon.

Keywords

Cite

@article{arxiv.1812.08705,
  title  = {A certain reciprocal power sum is never an integer},
  author = {Junyong Zhao and Shaofang Hong and Xiao Jiang},
  journal= {arXiv preprint arXiv:1812.08705},
  year   = {2018}
}

Comments

11 pages

R2 v1 2026-06-23T06:51:38.656Z